Cambrian lattices are fractionally Calabi-Yau via 2-cluster combinatorics
Abstract
Reading constructed a Cambrian lattice C for each oriented finite type Coxeter diagram . We show that the derived category of representations of C is fractionally Calabi-Yau for any , confirming a conjecture of Chapoton. This extends a result of Rognerud for Cambrian lattices of type A with linear orientation, better known as Tamari lattices. If is crystallographic, then C is given by the lattice of torsion classes of any hereditary algebra of type . In this case we introduce and study a class of intervals in C whose combinatorics matches the combinatorics of 2-cluster tilting objects in the 2-cluster category of . This allows us to compute the Calabi-Yau dimension of C.
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